Lipschitz Estimates and an application to trace formulae
Abstract
In this note, we provide an elementary proof for the expression of f(U)-f(V) in the form of a double operator integral for every Lipschitz function f on the unit circle and for a pair of unitary operators (U,V) with U-V∈S2() (the Hilbert-Schmidt class). As a consequence, we obtain the Schatten 2-Lipschitz estimate \|f(U)-f(V)\|2≤ \|f\|()\|U-V\|2 for all Lipschitz functions f:. Moreover, we develop an approach to the operator Lipschitz estimate for a pair of contractions with the assumption that one of them is a strict contraction, which significantly extends the class of functions from results known earlier. More specifically, for each p∈(1,∞) and for every pair of contractions (T0,T1) with \|T0\|<1, there exists a constant df, p,T0>0 such that \|f(T1)-f(T0)\|p≤ df,p, T0\|T1-T0\|p for all Lipschitz functions on . Using our Lipschitz estimates, we establish a modified Krein trace formula applicable to a specific category of pairs of contractions featuring Hilbert-Schmidt perturbations.
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